Improving the Threshold for Finding Rank-1 Matrices in a Subspace

Abstract

We consider a basic computational task of finding s planted rank-1 m × n matrices in a linear subspace U ⊂eq Rm × n where (U) = R s. The work of Johnston-Lovitz-Vijayaraghavan (FOCS 2023) gave a polynomial-time algorithm for this task and proved that it succeeds when R (1-o(1))mn/4, under minimal genericity assumptions on the input. Aiming to precisely characterize the performance of this algorithm, we improve the bound to R (1-o(1))mn/2 and also prove that the algorithm fails when R (1+o(1))mn/2. Numerical experiments indicate that the true breaking point is R = (1+o(1))mn/2. Our work implies new algorithmic results for tensor decomposition, for instance, decomposing order-4 tensors with twice as many components as before.

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